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Let AA be an n×nn×n matrix. Prove that if x⃗ x→ is an eigenvector of AA...

Let AA be an n×nn×n matrix. Prove that if x⃗ x→ is an eigenvector of AA corresponding to the eigenvalue λλ, then x⃗ x→ is also an eigenvector of A+cIA+cI, where cc is a scalar. Moreover, find the corresponding eigenvalue of A+cIA+cI.

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solo 6t A be suppose any non matrix an eigon vector of A Coresponding to the eigen valued a bo then Ax=dx 6+ B = At CIA + CI

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